17-12-2025
جامعة الملك عبدالعزيز
KING ABDULAZIZ UNIVERSITY
Vice Deanship of Library Affairs - Girls Campus
Document Details
Document Type
:
Thesis
Document Title
:
Numerical Solution of Coupled Nonlinear Shrödinger-KdV Equations
الحلول العددية لمعادلات Shrödinger-KdVالمزدوجة غير الخطية
Subject
:
. Nonlinear theories
Document Language
:
English
Abstract
:
The aim of this thesis is to solve numerically the coupled nonlinear Shrödinger -KdV equations using nite di¤erence method. In chapter 1: We present in detail, this equation and the exact solution, also we study its conserved quantities. The solution of the block tridiagonal system and penta-diagonal system are derived. We describe the xed point method and Runge Kutta of order 4 method for solving the nonlinear system. In chapter 2: We solve the coupled nonlinear Shrödinger -KdV equations numerically by using explicit method. The accuracy of the resulting scheme is second order in space and rst order in time and conditionally stable. Also, we have used the explicit Runge Kutta of order 4 method where the accuracy of the resulting scheme is second order in space and forth order in time and it is conditionally stable. We give the some numerical examples to show that this method is conserving the conserved quantities. In chapter 3: We present another method for solving the coupled nonlin- ear Shrödinger-KdV equations using Crank-Nicolson method, we get a scheme which is second order in space and time, and conditionally stable. We use xed point method for solving the nonlinear system obtained. We give some numerical examples to show that this method is conserving quantities. In chapter 4: We solve the coupled nonlinear Shrödinger -KdV equations numerically by linearizing the nonlinear system. Three linearization techniques are adopted. The accuracy of the resulting scheme in each case is second order in space and time and it is unconditionally stable.We give some numerical examples to show that this method is conserving the conserved quantities.
Supervisor
:
Mohammad Said Hammoudah
Thesis Type
:
Master Thesis
Publishing Year
:
1433 AH
2012 AD
Number Of Pages
:
82
Co-Supervisor
:
Farida M. Mosally
Added Date
:
Wednesday, March 5, 2014
Researchers
Researcher Name (Arabic)
Researcher Name (English)
Researcher Type
Dr Grade
Email
خديجة محمد العمودي
Al-Amoudi, Khadijah Mohammed
Investigator
Master
Files
File Name
Type
Description
36656.pdf
pdf
Back To Researches Page